Given k(x)=−0.5x5(3x+1)2(1−4x)

, find the multiplicity of (3x+1)
and describe the behavior of the graph of k(x) at the associated x-intercept.(1 point)
Responses

The multiplicity of (3x+1)
is −13
. At the associated x-intercept, the graph of k(x) touches the x-axis and turns around.
The multiplicity of left parenthesis 3 x plus 1 right parenthesis is negative Start Fraction 1 over 3 End Fraction . At the associated x -intercept, the graph of k ( x ) touches the x -axis and turns around.

The multiplicity of (3x+1)
is −13
. At the associated x-intercept, the graph of k(x) crosses the x-axis.
The multiplicity of left parenthesis 3 x plus 1 right parenthesis is negative Start Fraction 1 over 3 End Fraction . At the associated x -intercept, the graph of k ( x ) crosses the x -axis.

The multiplicity of (3x+1)
is 2. At the associated x-intercept, the graph of k(x) touches the x-axis and turns around.
The multiplicity of left parenthesis 3 x plus 1 right parenthesis is 2. At the associated x -intercept, the graph of k ( x ) touches the x -axis and turns around.

The multiplicity of (3x+1)
is 2. At the associated x-intercept, the graph of k(x) crosses the x-axis.

1 answer